Metanilpotent group

From Infogalactic: the planetary knowledge core

Jump to: navigation, search

In mathematics, in the field of group theory, a metanilpotent group is a group that is nilpotent by nilpotent. In other words, it has a normal nilpotent subgroup such that the quotient group is also nilpotent.

In symbols, $G$ is metanilpotent if there is a normal subgroup $N$ such that both $N$ and $G/N$ are nilpotent.

The following are clear:

Every metanilpotent group is a solvable group.
Every subgroup and every quotient of a metanilpotent group is metanilpotent.

References

J.C. Lennox, D.J.S. Robinson, The Theory of Infinite Soluble Groups, Oxford University Press, 2004, ISBN 0-19-850728-3. P.27.
D.J.S. Robinson, A Course in the Theory of Groups, GTM 80, Springer Verlag, 1996, ISBN 0-387-94461-3. P.150.

Retrieved from "https://infogalactic.com/w/index.php?title=Metanilpotent_group&oldid=366081"